Solve p=m(1-dt) - ScanMath

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Type your math problem... p=m(1-dt)

Question

Solve the equation

Solve for d

Solve for m

Solve for p

d = \frac{- p + m}{m t}

Evaluate

p = m (1 - d t)

Rewrite the expression

p = m (1 - t d)

Swap the sides of the equation

m (1 - t d) = p

Divide both sides

\frac{m ( 1 - t d )}{m} = \frac{p}{m}

Divide the numbers

1 - t d = \frac{p}{m}

Move the constant to the right side

- t d = \frac{p}{m} - 1

Subtract the terms

More Steps

Evaluate

\frac{p}{m} - 1

Reduce fractions to a common denominator

\frac{p}{m} - \frac{m}{m}

Write all numerators above the common denominator

\frac{p - m}{m}

- t d = \frac{p - m}{m}

Multiply by the reciprocal

- t d (- \frac{1}{t}) = \frac{p - m}{m} \times (- \frac{1}{t})

Multiply

d = \frac{p - m}{m} \times (- \frac{1}{t})

Solution

More Steps

Evaluate

\frac{p - m}{m} \times (- \frac{1}{t})

Multiplying or dividing an odd number of negative terms equals a negative

- \frac{p - m}{m} \times \frac{1}{t}

To multiply the fractions,multiply the numerators and denominators separately

- \frac{p - m}{m t}

Calculate the product

\frac{- p + m}{m t}

d = \frac{- p + m}{m t}

Show Solution

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